Fourier-Laplace Transformation and Painlevé Systems
Published:Dec 30, 2025 08:49
•1 min read
•ArXiv
Analysis
This paper investigates the relationship between different representations of Painlevé systems, specifically focusing on the Fourier-Laplace transformation. The core contribution is the description of this transformation between rank 3 and rank 2 D-module representations using formal microlocalization. This work is significant because it provides a deeper understanding of the structure of Painlevé systems, which are important in various areas of mathematics and physics. The conclusion about the existence of a biregular morphism between de Rham complex structures is a key result.
Key Takeaways
- •Applies formal microlocalization to study the Fourier-Laplace transformation.
- •Focuses on rank 3 and rank 2 D-module representations of Painlevé systems.
- •Establishes a connection between different de Rham complex structures.
Reference
“The paper concludes the existence of a biregular morphism between the corresponding de Rham complex structures.”